const In : set set prop term iIn = In infix iIn 2000 2000 term PNoEq_ = \x:set.\p:set prop.\q:set prop.!y:set.y iIn x -> (p y <-> q y) term SNoEq_ = \x:set.\y:set.\z:set.PNoEq_ x (\w:set.w iIn y) \w:set.w iIn z term Subq = \x:set.\y:set.!z:set.z iIn x -> z iIn y const ordinal : set prop const SNo_ : set set prop term SNo = \x:set.?y:set.ordinal y & SNo_ y x const PNoLt : set (set prop) set (set prop) prop term PNoLt_pwise = \P:set (set prop) prop.\Q:set (set prop) prop.!x:set.ordinal x -> !p:set prop.P x p -> !y:set.ordinal y -> !q:set prop.Q y q -> PNoLt x p y q term PNo_strict_upperbd = \P:set (set prop) prop.\x:set.\p:set prop.!y:set.ordinal y -> !q:set prop.P y q -> PNoLt y q x p term PNo_strict_lowerbd = \P:set (set prop) prop.\x:set.\p:set prop.!y:set.ordinal y -> !q:set prop.P y q -> PNoLt x p y q term PNo_strict_imv = \P:set (set prop) prop.\Q:set (set prop) prop.\x:set.\p:set prop.PNo_strict_upperbd P x p & PNo_strict_lowerbd Q x p term nIn = \x:set.\y:set.~ x iIn y const PNo_rel_strict_imv : (set (set prop) prop) (set (set prop) prop) set (set prop) prop const ordsucc : set set term PNo_rel_strict_split_imv = \P:set (set prop) prop.\Q:set (set prop) prop.\x:set.\p:set prop.PNo_rel_strict_imv P Q (ordsucc x) (\y:set.p y & y != x) & PNo_rel_strict_imv P Q (ordsucc x) \y:set.p y | y = x const SNoLt : set set prop term < = SNoLt infix < 2020 2020 term SNoCutP = \x:set.\y:set.(!z:set.z iIn x -> SNo z) & (!z:set.z iIn y -> SNo z) & !z:set.z iIn x -> !w:set.w iIn y -> z < w term PNo_least_rep = \P:set (set prop) prop.\Q:set (set prop) prop.\x:set.\p:set prop.ordinal x & PNo_strict_imv P Q x p & !y:set.y iIn x -> !q:set prop.~ PNo_strict_imv P Q y q const PSNo : set (set prop) set const PNo_bd : (set (set prop) prop) (set (set prop) prop) set const PNo_pred : (set (set prop) prop) (set (set prop) prop) set prop term SNoCut = \x:set.\y:set.PSNo (PNo_bd (\z:set.\p:set prop.ordinal z & PSNo z p iIn x) \z:set.\p:set prop.ordinal z & PSNo z p iIn y) (PNo_pred (\z:set.\p:set prop.ordinal z & PSNo z p iIn x) \z:set.\p:set prop.ordinal z & PSNo z p iIn y) term PNoLt_ = \x:set.\p:set prop.\q:set prop.?y:set.y iIn x & (PNoEq_ y p q & ~ p y & q y) term PNo_lenbdd = \x:set.\P:set (set prop) prop.!y:set.!p:set prop.P y p -> y iIn x const SNoLev : set set lemma !x:set.!y:set.!z:set.!w:set.ordinal (PNo_bd (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y) -> PNo_strict_imv (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) (\u:set.\p:set prop.ordinal u & PSNo u p iIn y) (PNo_bd (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y) (PNo_pred (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y) -> (!u:set.u iIn PNo_bd (\v:set.\p:set prop.ordinal v & PSNo v p iIn x) (\v:set.\p:set prop.ordinal v & PSNo v p iIn y) -> !p:set prop.~ PNo_strict_imv (\v:set.\q:set prop.ordinal v & PSNo v q iIn x) (\v:set.\q:set prop.ordinal v & PSNo v q iIn y) u p) -> ordinal (SNoLev z) -> PNo_strict_imv (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) (\u:set.\p:set prop.ordinal u & PSNo u p iIn y) (SNoLev z) (\u:set.u iIn z) -> Subq (PNo_bd (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y) (SNoLev z) -> w iIn PNo_bd (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) (\u:set.\p:set prop.ordinal u & PSNo u p iIn y) -> PNoEq_ w (PNo_pred (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y) (\u:set.u iIn z) -> ~ PNo_pred (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) (\u:set.\p:set prop.ordinal u & PSNo u p iIn y) w -> w iIn z -> ordinal w -> ordinal (ordsucc w) -> ~ ~ (w iIn z & w != w) var x:set var y:set var z:set var w:set hyp ordinal (PNo_bd (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y) hyp PNo_strict_imv (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) (\u:set.\p:set prop.ordinal u & PSNo u p iIn y) (PNo_bd (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y) (PNo_pred (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y) hyp !u:set.u iIn PNo_bd (\v:set.\p:set prop.ordinal v & PSNo v p iIn x) (\v:set.\p:set prop.ordinal v & PSNo v p iIn y) -> !p:set prop.~ PNo_strict_imv (\v:set.\q:set prop.ordinal v & PSNo v q iIn x) (\v:set.\q:set prop.ordinal v & PSNo v q iIn y) u p hyp ordinal (SNoLev z) hyp PNo_strict_imv (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) (\u:set.\p:set prop.ordinal u & PSNo u p iIn y) (SNoLev z) \u:set.u iIn z hyp Subq (PNo_bd (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y) (SNoLev z) hyp w iIn PNo_bd (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y hyp PNoEq_ w (PNo_pred (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) \u:set.\p:set prop.ordinal u & PSNo u p iIn y) \u:set.u iIn z hyp ~ PNo_pred (\u:set.\p:set prop.ordinal u & PSNo u p iIn x) (\u:set.\p:set prop.ordinal u & PSNo u p iIn y) w hyp w iIn z hyp ordinal w claim ~ ordinal (ordsucc w)